Lecture # 06 Consumer Choice Lecturer: Martin Paredes

1. Lecture # 06 Consumer Choice Lecturer: Martin Paredes

2. Outline Motivation The Budget Constraint Consumer Choice Duality Some Applications

3. Motivation • Example: Consumer Expenditures, US, 2001 • Households with income $20,000-$29,999 • Income (after tax): $ 23,924 • Total expenditures: $ 28,623 • Households with income over $70,000 • Income (after tax): $ 104,685 • Total expenditures: $ 76,124

4. Motivation • Example: Consumer Expenditures, US, 2001 • Allocation of Spending • CategoryIncome $20K-$29KIncome over $70K • Food $4,499 $9,066 • Housing $9,525 $23,622 • Clothing $1,063 $3,479 • Transportation $5,644 $13,982 • Health Care $2,089 $2,908 • Entertainment $1,187 $3,986

5. The Budget Constraint • Assume only two goods available: X and Y • Consumers take as given: • Price of X: PX • Price of Y: PY • Income: I • Total expenditure on basket: PX . X + PY . Y • The Basket is affordable if total expenditure does not exceed total income: • PX . X + PY . Y  I

6. The Budget Constraint Definition: The Budget Constraint defines the set of baskets that the consumer may purchase given the income available. PX . X + PY . Y  I

7. The Budget Constraint Other Definitions: The Budget Set is the set of baskets that are affordable to the consumer The Budget Line is the set of baskets that are just affordable: PX . X + PY . Y = I => Y = I — PX . X PY PY

8. Example: • Suppose I = € 10 PX = € 1 PY = € 2 • Budget line: 1. X + 2 . Y = 10 or: Y = 10 — 1 . X 2 2

9. Y A • I/PY= 5 B • X I/PX = 10

10. Y A • I/PY= 5 B • X I/PX = 10

11. Y Budget line = BL1 A • I/PY= 5 B • X I/PX = 10

12. Y Budget line = BL1 A • I/PY= 5 -PX/PY = -1/2 B • X I/PX = 10

13. Y Budget line = BL1 A • I/PY= 5 -PX/PY = -1/2 • C B • X I/PX = 10

14. Change in Income: Shift of the Budget Line • Suppose I = € 12 PX = € 1 PY = € 2 => Budget line: X + 2Y = 12 • If the income rises, the budget set expands, and both intercepts shift out • Since prices have not changed, the slope of the budget line does not change

15. Example: Shift of a budget line Y I = € 12 PX = € 1 PY = € 2 Y = 6 - X/2 …. BL2 5 BL1 10 X

16. Example: Shift of a budget line Y I = € 12 PX = € 1 PY = € 2 Y = 6 - X/2 …. BL2 6 5 BL2 BL1 10 12 X

17. Change in Price: Rotation of the Budget Line • Suppose I = € 10 PX = € 1 PY = € 3 => Budget line: X + 3Y = 10 • If the price of Y rises, the budget line gets flatter, and the vertical intercept shifts in • Since neither income nor the price of X have changed, the horizontal intercept does not change

18. Example: Rotation of a budget line Y I = € 10 PX = € 1 PY = € 3 Y = 3.33 - X/3 …. BL2 BL1 5 10 X

19. Example: Rotation of a budget line Y I = €10 PX = € 1 PY = € 3 Y = 3.33 - X/3 …. BL2 BL1 5 3.33 BL2 10 X

20. Consumer Choice Assumptions: Consumers only choose non-negative quantities "Rational” choice: The consumer chooses the basket that maximizes his satisfaction given the constraint that his budget imposes. Consumer’s Problem: Max U(X,Y) subject to: PX . X + PY . Y  I X,Y

21. Consumer Choice • There are two types of equilibrium: • Interior Solution: Consumer chooses a positive quantity of both goods • Corner Solution: Consumer chooses not to consume one of the goods.

22. Interior Solution • Graphical interpretation: The optimal consumption basket is at a point where the indifference curve is just tangent to the budget line. => MRSX,Y = PX PY

23. Interior Solution • Economic interpretation: The rate at which the consumer would be willing to exchange X for Y has to be the same as the rate at which they are exchanged in the marketplace => MRSX,Y = PX PY

24. Interior Solution Y BL X 0

25. Interior Solution Y IC1 BL X 0

26. Interior Solution Y IC3 IC1 BL X 0

27. Interior Solution Y Optimal choice (interior solution) at point A • A IC3 IC2 IC1 BL X 0

28. Interior Solution • To find algebraically the quantities of X and Y in the optimal basket, we have to solve a system of two equations for two unknowns: 1. MRSX,Y = PX PY 2. PX . X + PY . Y = I

29. Example: • Suppose U(X,Y) = XY I = € 1000 PX = € 50 PY = € 100 • Which is the optimal choice for the consumer?

30. MRSX,Y = MUX = Y MUY X • PX = 50 = 1 PY 100 2 • So X = 2Y

31. Budget line: PX . X + PY . Y = I => 50 X + 100 Y = 1000 • Then: 50 (2Y) + 100 Y = 1000 200 Y = 1000 => Y* = 5 => X* = 10

32. Example: Interior Consumer Optimum Y 50X + 100Y = 1000 • 5 U* = XY = 50 X 0 10

33. Interior Solution • The tangency condition can also be written as: MUX = MUY PX PY • Interpretation: At the optimal basket, the marginal utility per euro spent on each commodity is the same. • “Each good gives equal bang for the buck” • Marginal reasoning to maximize

34. Corner Solution • Definition: A corner solution occurs when the optimal bundle contains none of one of the goods. • The tangency condition may not hold at a corner solution.

35. Corner Solution • How do you know whether the optimal bundle is interior or at a corner? • Graph the indifference curves • Check to see whether tangency condition ever holds at positive quantities of X and Y

36. Example: Perfect Substitutes • Suppose U(X,Y) = X + Y I = € 1000 PX = € 50 PY = € 100 • Which is the optimal choice for the consumer?

37. MRSX,Y = MUX = 1 MUY • PX = 50 = 1 PY 100 2 • So the tangency condition is not satisfied

38. Example: Corner Solution – Perfect Substitutes Y BL: 50X + 100Y = 1000 10 X 0 20

39. Example: Corner Solution – Perfect Substitutes Y BL U = X+Y 10 X 0 20

40. Example: Corner Solution – Perfect Substitutes Y 10 X 0 20

41. Example: Corner Solution – Perfect Substitutes Y 10 A • X 0 20

42. Suppose now: U(X,Y) = X + Y I = € 1000 PX = € 100 PY = € 50 • Which is the optimal choice for the consumer?

43. Example: Corner Solution – Perfect Substitutes Y BL: 100X + 50Y = 1000 20 X 0 10

44. Example: Corner Solution – Perfect Substitutes Y BL B • 20 X 0 10